# proportions of a perspective-deformed rectangle

Given a 2d picture of a rectangle distorted by perspective:

I know that the shape was originally a rectangle, but I do not know its original size.

If I know the pixel coordinates of the corners in this picture, how can I calculate the original proportions, i.e. the quotient ( width / height ) of the rectangle?

(background: the goal is to automatically undistort photos of rectangular documents, edge detection will probably be done with hough transform)

# UPDATE:

There has been some discussion on whether it is possible at all to determine the width:height ratio with the information given. My naive thought was that it must be possible, since I can think of no way to project for example a 1:4 rectangle onto the quadrangle depicted above. The ratio appears clearly close to 1:1, so there should be a way to determine it mathematically. I have however no proof for this beyond my intuitive guess.

I have not yet fully understood the arguments presented below, but I think there must be some implicit assumption that we are missing here and that is interpreted differently.

However, after hours of searching, I have finally found some papers relevant to the problem. I am struggling to understand the math used in there, so far without success. Particularly the first paper seems to discuss exactly what I wanted to do, unfortunately without code examples and very dense math.

• Zhengyou Zhang , Li-Wei He, "Whiteboard scanning and image enhancement" http://research.microsoft.com/en-us/um/people/zhang/papers/tr03-39.pdf p.11

"Because of the perspective distortion, the image of a rectangle appears to be a quadrangle. However, since we know that it is a rectangle in space, we are able to estimate both the camera’s focal length and the rectangle’s aspect ratio."

• ROBERT M. HARALICK "Determining camera parameters from the perspective projection of a rectangle" http://portal.acm.org/citation.cfm?id=87146

"we show how to use the 2D perspective projection of a rectangle of unknown size and position in 3D space to determine the camera look angle parameters relative to the plans of the rectangle."

-
p.s. just to be clear: the width and height itself are of course indeterminable with the information given, I am looking for the the quotient of width / height –  HugoRune Jul 28 '09 at 14:49
I've updated my answer, the conclusion is that the quotient width/height is also indeterminable with the information given. –  fortran Jul 29 '09 at 17:41
I've updated mine too. If you know the image center, then the problem has actually one solution. See the diagrams I added. –  Eric Bainville Jul 30 '09 at 14:32
Your friend here is projective geometry. –  Eric Aug 3 '09 at 6:28

Here is my attempt at answering my question after reading the paper

I manipulated the equations for some time in SAGE, and came up with this pseudo-code in c-style:

``````
// in case it matters: licensed under GPLv2 or later
// legend:
// sqr(x)  = x*x
// sqrt(x) = square root of x

// let m1x,m1y ... m4x,m4y be the (x,y) pixel coordinates
// of the 4 corners of the detected quadrangle
// i.e. (m1x, m1y) are the cordinates of the first corner,
// (m2x, m2y) of the second corner and so on.
// let u0, v0 be the pixel coordinates of the principal point of the image
// for a normal camera this will be the center of the image,
// i.e. u0=IMAGEWIDTH/2; v0 =IMAGEHEIGHT/2
// This assumption does not hold if the image has been cropped asymmetrically

// first, transform the image so the principal point is at (0,0)
// this makes the following equations much easier
m1x = m1x - u0;
m1y = m1y - v0;
m2x = m2x - u0;
m2y = m2y - v0;
m3x = m3x - u0;
m3y = m3y - v0;
m4x = m4x - u0;
m4y = m4y - v0;

// temporary variables k2, k3
double k2 = ((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x) /
((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) ;

double k3 = ((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y - m1y*m4x) /
((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) ;

// f_squared is the focal length of the camera, squared
// if k2==1 OR k3==1 then this equation is not solvable
// if the focal length is known, then this equation is not needed
// in that case assign f_squared= sqr(focal_length)
double f_squared =
-((k3*m3y - m1y)*(k2*m2y - m1y) + (k3*m3x - m1x)*(k2*m2x - m1x)) /
((k3 - 1)*(k2 - 1)) ;

//The width/height ratio of the original rectangle
double whRatio = sqrt(
(sqr(k2 - 1) + sqr(k2*m2y - m1y)/f_squared + sqr(k2*m2x - m1x)/f_squared) /
(sqr(k3 - 1) + sqr(k3*m3y - m1y)/f_squared + sqr(k3*m3x - m1x)/f_squared)
) ;

// if k2==1 AND k3==1, then the focal length equation is not solvable
// but the focal length is not needed to calculate the ratio.
// I am still trying to figure out under which circumstances k2 and k3 become 1
// but it seems to be when the rectangle is not distorted by perspective,
// i.e. viewed straight on. Then the equation is obvious:
if (k2==1 && k3==1) whRatio = sqrt(
(sqr(m2y-m1y) + sqr(m2x-m1x)) /
(sqr(m3y-m1y) + sqr(m3x-m1x))

// After testing, I found that the above equations
// actually give the height/width ratio of the rectangle,
// not the width/height ratio.
// If someone can find the error that caused this,
// I would be most grateful.
// until then:
whRatio = 1/whRatio;
``````

## Update: here is how these equations where determined:

The following is code in SAGE. It can be accessed online at http://www.sagenb.org/home/pub/704/. (Sage is really useful in solving equations, and useable in any browser, check it out)

``````# CALCULATING THE ASPECT RATIO OF A RECTANGLE DISTORTED BY PERSPECTIVE

#
# BIBLIOGRAPHY:
# [zhang-single]: "Single-View Geometry of A Rectangle
#  With Application to Whiteboard Image Rectification"
#  by Zhenggyou Zhang
#  http://research.microsoft.com/users/zhang/Papers/WhiteboardRectification.pdf

# pixel coordinates of the 4 corners of the quadrangle (m1, m2, m3, m4)
# see [zhang-single] figure 1
m1x = var('m1x')
m1y = var('m1y')
m2x = var('m2x')
m2y = var('m2y')
m3x = var('m3x')
m3y = var('m3y')
m4x = var('m4x')
m4y = var('m4y')

# pixel coordinates of the principal point of the image
# for a normal camera this will be the center of the image,
# i.e. u0=IMAGEWIDTH/2; v0 =IMAGEHEIGHT/2
# This assumption does not hold if the image has been cropped asymmetrically
u0 = var('u0')
v0 = var('v0')

# pixel aspect ratio; for a normal camera pixels are square, so s=1
s = var('s')

# homogenous coordinates of the quadrangle
m1 = vector ([m1x,m1y,1])
m2 = vector ([m2x,m2y,1])
m3 = vector ([m3x,m3y,1])
m4 = vector ([m4x,m4y,1])

# the following equations are later used in calculating the the focal length
# and the rectangle's aspect ratio.
# temporary variables: k2, k3, n2, n3

# see [zhang-single] Equation 11, 12
k2_ = m1.cross_product(m4).dot_product(m3) / m2.cross_product(m4).dot_product(m3)
k3_ = m1.cross_product(m4).dot_product(m2) / m3.cross_product(m4).dot_product(m2)
k2 = var('k2')
k3 = var('k3')

# see [zhang-single] Equation 14,16
n2 = k2 * m2 - m1
n3 = k3 * m3 - m1

# the focal length of the camera.
f = var('f')
# see [zhang-single] Equation 21
f_ = sqrt(
-1 / (
n2[2]*n3[2]*s^2
) * (
(
n2[0]*n3[0] - (n2[0]*n3[2]+n2[2]*n3[0])*u0 + n2[2]*n3[2]*u0^2
)*s^2 + (
n2[1]*n3[1] - (n2[1]*n3[2]+n2[2]*n3[1])*v0 + n2[2]*n3[2]*v0^2
)
)
)

# standard pinhole camera matrix
# see [zhang-single] Equation 1
A = matrix([[f,0,u0],[0,s*f,v0],[0,0,1]])

#the width/height ratio of the original rectangle
# see [zhang-single] Equation 20
whRatio = sqrt (
(n2*A.transpose()^(-1) * A^(-1)*n2.transpose()) /
(n3*A.transpose()^(-1) * A^(-1)*n3.transpose())
)
``````

The simplified equations in the c-code where determined by

``````print "simplified equations, assuming u0=0, v0=0, s=1"
print "k2 := ", k2_
print "k3 := ", k3_
print "f  := ", f_(u0=0,v0=0,s=1)
print "whRatio := ", whRatio(u0=0,v0=0,s=1)

simplified equations, assuming u0=0, v0=0, s=1
k2 :=  ((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)/((m2y
- m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x)
k3 :=  ((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y - m1y*m4x)/((m3y
- m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x)
f  :=  sqrt(-((k3*m3y - m1y)*(k2*m2y - m1y) + (k3*m3x - m1x)*(k2*m2x
- m1x))/((k3 - 1)*(k2 - 1)))
whRatio :=  sqrt(((k2 - 1)^2 + (k2*m2y - m1y)^2/f^2 + (k2*m2x -
m1x)^2/f^2)/((k3 - 1)^2 + (k3*m3y - m1y)^2/f^2 + (k3*m3x -
m1x)^2/f^2))

print "Everything in one equation:"
print "whRatio := ", whRatio(f=f_)(k2=k2_,k3=k3_)(u0=0,v0=0,s=1)

Everything in one equation:
whRatio :=  sqrt(((((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y -
m1y*m4x)/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) -
1)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)/((m2y -
m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - 1)*(((m1y -
m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)*m2y/((m2y - m4y)*m3x
- (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - m1y)^2/((((m1y - m4y)*m2x -
(m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3y/((m3y - m4y)*m2x - (m3x -
m4x)*m2y + m3x*m4y - m3y*m4x) - m1y)*(((m1y - m4y)*m3x - (m1x -
m4x)*m3y + m1x*m4y - m1y*m4x)*m2y/((m2y - m4y)*m3x - (m2x - m4x)*m3y
+ m2x*m4y - m2y*m4x) - m1y) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y +
m1x*m4y - m1y*m4x)*m3x/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y
- m3y*m4x) - m1x)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y -
m1y*m4x)*m2x/((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x)
- m1x)) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y -
m1y*m4x)/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) -
1)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)/((m2y -
m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - 1)*(((m1y -
m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)*m2x/((m2y - m4y)*m3x
- (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - m1x)^2/((((m1y - m4y)*m2x -
(m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3y/((m3y - m4y)*m2x - (m3x -
m4x)*m2y + m3x*m4y - m3y*m4x) - m1y)*(((m1y - m4y)*m3x - (m1x -
m4x)*m3y + m1x*m4y - m1y*m4x)*m2y/((m2y - m4y)*m3x - (m2x - m4x)*m3y
+ m2x*m4y - m2y*m4x) - m1y) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y +
m1x*m4y - m1y*m4x)*m3x/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y
- m3y*m4x) - m1x)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y -
m1y*m4x)*m2x/((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x)
- m1x)) - (((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y -
m1y*m4x)/((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) -
1)^2)/((((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y -
m1y*m4x)/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) -
1)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)/((m2y -
m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - 1)*(((m1y -
m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3y/((m3y - m4y)*m2x
- (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) - m1y)^2/((((m1y - m4y)*m2x -
(m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3y/((m3y - m4y)*m2x - (m3x -
m4x)*m2y + m3x*m4y - m3y*m4x) - m1y)*(((m1y - m4y)*m3x - (m1x -
m4x)*m3y + m1x*m4y - m1y*m4x)*m2y/((m2y - m4y)*m3x - (m2x - m4x)*m3y
+ m2x*m4y - m2y*m4x) - m1y) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y +
m1x*m4y - m1y*m4x)*m3x/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y
- m3y*m4x) - m1x)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y -
m1y*m4x)*m2x/((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x)
- m1x)) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y -
m1y*m4x)/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) -
1)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y - m1y*m4x)/((m2y -
m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x) - 1)*(((m1y -
m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3x/((m3y - m4y)*m2x
- (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) - m1x)^2/((((m1y - m4y)*m2x -
(m1x - m4x)*m2y + m1x*m4y - m1y*m4x)*m3y/((m3y - m4y)*m2x - (m3x -
m4x)*m2y + m3x*m4y - m3y*m4x) - m1y)*(((m1y - m4y)*m3x - (m1x -
m4x)*m3y + m1x*m4y - m1y*m4x)*m2y/((m2y - m4y)*m3x - (m2x - m4x)*m3y
+ m2x*m4y - m2y*m4x) - m1y) + (((m1y - m4y)*m2x - (m1x - m4x)*m2y +
m1x*m4y - m1y*m4x)*m3x/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y
- m3y*m4x) - m1x)*(((m1y - m4y)*m3x - (m1x - m4x)*m3y + m1x*m4y -
m1y*m4x)*m2x/((m2y - m4y)*m3x - (m2x - m4x)*m3y + m2x*m4y - m2y*m4x)
- m1x)) - (((m1y - m4y)*m2x - (m1x - m4x)*m2y + m1x*m4y -
m1y*m4x)/((m3y - m4y)*m2x - (m3x - m4x)*m2y + m3x*m4y - m3y*m4x) -
1)^2))

``````
``````
# some testing:
# - choose a random rectangle,
# - project it onto a random plane,
# - insert the corners in the above equations,
# - check if the aspect ratio is correct.

from sage.plot.plot3d.transform import rotate_arbitrary

#redundandly random rotation matrix
rand_rotMatrix = \
rotate_arbitrary((uniform(-5,5),uniform(-5,5),uniform(-5,5)),uniform(-5,5)) *\
rotate_arbitrary((uniform(-5,5),uniform(-5,5),uniform(-5,5)),uniform(-5,5)) *\
rotate_arbitrary((uniform(-5,5),uniform(-5,5),uniform(-5,5)),uniform(-5,5))

#random translation vector
rand_transVector = vector((uniform(-10,10),uniform(-10,10),uniform(-10,10))).transpose()

#random rectangle parameters
rand_width =uniform(0.1,10)
rand_height=uniform(0.1,10)
rand_left  =uniform(-10,10)
rand_top   =uniform(-10,10)

#random focal length and principal point
rand_f  = uniform(0.1,100)
rand_u0 = uniform(-100,100)
rand_v0 = uniform(-100,100)

# homogenous standard pinhole projection, see [zhang-single] Equation 1
hom_projection = A * rand_rotMatrix.augment(rand_transVector)

# construct a random rectangle in the plane z=0, then project it randomly
rand_m1hom = hom_projection*vector((rand_left           ,rand_top            ,0,1)).transpose()
rand_m2hom = hom_projection*vector((rand_left           ,rand_top+rand_height,0,1)).transpose()
rand_m3hom = hom_projection*vector((rand_left+rand_width,rand_top            ,0,1)).transpose()
rand_m4hom = hom_projection*vector((rand_left+rand_width,rand_top+rand_height,0,1)).transpose()

#change type from 1x3 matrix to vector
rand_m1hom = rand_m1hom.column(0)
rand_m2hom = rand_m2hom.column(0)
rand_m3hom = rand_m3hom.column(0)
rand_m4hom = rand_m4hom.column(0)

#normalize
rand_m1hom = rand_m1hom/rand_m1hom[2]
rand_m2hom = rand_m2hom/rand_m2hom[2]
rand_m3hom = rand_m3hom/rand_m3hom[2]
rand_m4hom = rand_m4hom/rand_m4hom[2]

#substitute random values for f, u0, v0
rand_m1hom = rand_m1hom(f=rand_f,s=1,u0=rand_u0,v0=rand_v0)
rand_m2hom = rand_m2hom(f=rand_f,s=1,u0=rand_u0,v0=rand_v0)
rand_m3hom = rand_m3hom(f=rand_f,s=1,u0=rand_u0,v0=rand_v0)
rand_m4hom = rand_m4hom(f=rand_f,s=1,u0=rand_u0,v0=rand_v0)

# printing the randomly choosen values
print "ground truth: f=", rand_f, "; ratio=", rand_width/rand_height

# substitute all the variables in the equations:
print "calculated: f= ",\
f_(k2=k2_,k3=k3_)(s=1,u0=rand_u0,v0=rand_v0)(
m1x=rand_m1hom[0],m1y=rand_m1hom[1],
m2x=rand_m2hom[0],m2y=rand_m2hom[1],
m3x=rand_m3hom[0],m3y=rand_m3hom[1],
m4x=rand_m4hom[0],m4y=rand_m4hom[1],
),"; 1/ratio=", \
1/whRatio(f=f_)(k2=k2_,k3=k3_)(s=1,u0=rand_u0,v0=rand_v0)(
m1x=rand_m1hom[0],m1y=rand_m1hom[1],
m2x=rand_m2hom[0],m2y=rand_m2hom[1],
m3x=rand_m3hom[0],m3y=rand_m3hom[1],
m4x=rand_m4hom[0],m4y=rand_m4hom[1],
)

print "k2 = ", k2_(
m1x=rand_m1hom[0],m1y=rand_m1hom[1],
m2x=rand_m2hom[0],m2y=rand_m2hom[1],
m3x=rand_m3hom[0],m3y=rand_m3hom[1],
m4x=rand_m4hom[0],m4y=rand_m4hom[1],
), "; k3 = ", k3_(
m1x=rand_m1hom[0],m1y=rand_m1hom[1],
m2x=rand_m2hom[0],m2y=rand_m2hom[1],
m3x=rand_m3hom[0],m3y=rand_m3hom[1],
m4x=rand_m4hom[0],m4y=rand_m4hom[1],
)

# ATTENTION: testing revealed, that the whRatio
# is actually the height/width ratio,
# not the width/height ratio
# if anyone can find the error that caused this, I'd be grateful

ground truth: f= 72.1045134124554 ; ratio= 3.46538779959142
calculated: f=  72.1045134125 ; 1/ratio= 3.46538779959
k2 =  0.99114614987 ; k3 =  1.57376280159
``````
-
Thanks for the code and the nice problem! –  Eric Bainville Aug 3 '09 at 18:32
Thank you, Hugo. You should not use == operator when working with doubles. Better if you write code like this: <code> double kk = (k3 - 1)*(k2 - 1); if (abs(kk) < 0.0001) { // there is no perspective distortion... use formula 2 } else { // there is perspective distortion... use formula 1 } </code> –  Octavian Feb 4 '14 at 11:38
Regarding the height/width / width/height problem: I don't see how you would know that. Given only an image the objects ratio could be both, couldn't it? What is widht and what is height is usually just a convention. –  Mene Mar 24 at 14:09
And for others trying to implement this: take care about the order of the vertices, they are not counter-clockwise, but some sort of zig-zag. Take a look in the paper. –  Mene Mar 24 at 21:13

Update

After reading your update, and looking at the first reference (Whiteboard scanning and image enhancement), I see where the missing point is.

The input data of the problem is a quadruple (A,B,C,D), AND the center O of the projected image. In the article, it corresponds to the assumption u0=v0=0. Adding this point, the problem becomes constrained enough to get the aspect ratio of the rectangle.

The problem is then restated as follows: Given a quadruple (A,B,C,D) in the Z=0 plane, find the eye position E(0,0,h), h>0 and a 3D plane P such that the projection of (A,B,C,D) on P is a rectangle.

Note that P is determined by E: to get a parallelogram, P must contain parallels to (EU) and (EV), where U=(AB)x(CD) and V=(AD)x(BC).

Experimentally, it seems that this problem has in general one unique solution, corresponding to a unique value of the w/h ratio of the rectangle.

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No, you can't determine the rectangle ratio from the projection.

In the general case, a quadruple (A,B,C,D) of four non collinear points of the Z=0 plane is the projection of infinitely many rectangles, with infinitely many width/height ratios.

Consider the two vanishing points U, intersection of (AB) and (CD) and V, intersection of (AD) and (BC), and the point I, intersection of the two diagonals (AC) and (BD). To project as ABCD, a parallelogram of center I must lie on a plane containing the line parallel to (UV) through point I. On one such plane, you can find many rectangles projecting to ABCD, all with a different w/h ratio.

See these two images done with Cabri 3D. In the two cases ABCD is unchanged (on the gray Z=0 plane), and the blue plane containing the rectangle is not changed either. The green line partially hidden is the (UV) line and the visible green line is parallel to it and contains I.

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Excuse me, but this doesn't look right. You appear to have moved the camera between these two cases, which will change the appearance of ABCD. Projecting onto a plane like this is only approximately correct at best, and you've broken the rules. –  Beta Jul 28 '09 at 19:00
Yes, the eye is at the intersection of the red lines. You're right that the position of the camera changes between the two views. What does not change is the input of the problem: the projected ABCD. –  Eric Bainville Jul 28 '09 at 19:19
Excuse me, but you're wrong. You're projecting onto the wrong plane. If I construct a 2:1 rectangle, give it position and orientation, and place the camera, do you think you can find a 3:1 rectangle that looks the same to the camera? –  Beta Jul 28 '09 at 20:57
In the question as I understood it, we only have the projected rectangle as input (ABCD on the gray plane). We don't know anything about the projection, so we can assume it is defined by a point and a plane. Then the question can be restated as: do all the rectangles of the 3D space projecting into ABCD have the same w/h ratio? –  Eric Bainville Jul 28 '09 at 21:14
Without moving the camera, I don't think we can project a 2:1 and a 3:1 rectangle to the same ABCD in the general case. But as I said in a previous comment, this is not the original problem, where we don't know where the camera is. –  Eric Bainville Jul 29 '09 at 6:48

Size isnt really needed, and neither are proportions. And knowing which side is up is kind of irrelevant considering he's using photos/scans of documents. I doubt hes going to scan the back sides of them.

"Corner intersection" is the method to correct perspective. This might be of help:

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Thanks, but I am not sure if I understand this fully: Using the information given in the linked answer, I can map the quadrangle in the picture to an arbitrary rectangle, by subdividing at the intersection of the diagonals. What I would like to do is map the quadrangle to a rectangle with the correct proportions. So a picture of a square should be mapped only to a square. I am not sure how to get the ratio of sides. Googling for "corner intersection" did not work. –  HugoRune Jul 28 '09 at 15:40
If you continue to intersect down until the rectangles are smaller than pixels, from there you can measure the height and width... then you would know how big to create your destination rectangle.. then just map backwards from there. –  Neil N Jul 28 '09 at 18:32
I am not sure how that would work. When I intersect the original quadrangle n times, i will get 2^n * 2^n smaller quadrangles. Even if they are smaller than pixels, they still have the exact same proportions as the original quadrangle, and the original quadrangle will be exactly 2^n small_quadrangles high and 2^n small quadrangles wide. If I map each small quadrangle to a pixel, I will end up with a square. –  HugoRune Jul 29 '09 at 0:29
If both height and width intersection became smaller than pixel height/width on the same iteration, then yes you would have a square. If Height took twice as many iterations as width, you have a 2:1 H:W ratio... get it? –  Neil N Jul 29 '09 at 18:14
Sorry for being dense, but I do not get it at all. Using the examples shown here: freespace.virgin.net/hugo.elias/graphics/x_persp.htm If I intersect the quadrangle ABCD into smaller and smaller similar sub-quadrangles, I will eventually get sub-quadrangles smaller than a pixel. But on which iteration that happens depends: close to the CD side, the sub-quadrangles will be smaller than the ones close to the AB side of the original quadrangle. So the value I get seems arbitrary, and I do not understand how this is related to the ratio of the undistorted rectangle. –  HugoRune Jul 29 '09 at 21:33

On the question of why the results give h/w rather then w/h: I'm wondering if the expression of Equation 20 above is correct. Posted is:

``````       whRatio = sqrt (
(n2*A.transpose()^(-1) * A^(-1)*n2.transpose()) /
(n3*A.transpose()^(-1) * A^(-1)*n3.transpose())
)
``````

When I try to execute that with OpenCV, I get an exception. But everything works correctly when I use the following equation which to me looks more like Equation 20: But based on Equation 20, it looks like it should be:

``````        whRatio = sqrt (
(n2.transpose()*A.transpose()^(-1) * A^(-1)*n2) /
(n3.transpose()*A.transpose()^(-1) * A^(-1)*n3)
)
``````
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This is odd, those operations shouldn't even be defined. I don't know much about SAGE, but it seems n2 and n3 are transposed in comparison with the paper. At least I cannot put your sugestion to work in SAGE, as the operations are not defined. –  Mene Mar 24 at 19:35

it is impossible to know the width of this rectangle without knowing the distance of the 'camera'.

a small rectangle viewed from 5 centimeters distance looks the same as a huge rectangle as seen from meters away

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Partially correct. Not only do you need to know the distance, you need to know the field of view of the camera as well. i.e. a typical 35mm camera has a view angle of 54 degrees with no zoom. –  Neil N Jul 28 '09 at 14:38
one would probably also need to know the rotation, since it's unclear which side is up –  Toad Jul 28 '09 at 14:40
I do not need the width, just the proportions, i.e. the quotient (width / height). The scale is of course dependent on the distance to the observer, but as far as I can tell, the proportions are not. a 1by1 square will map to different projections than a 1by2 rectangle, correct? –  HugoRune Jul 28 '09 at 14:47
as a side note you can calculate the distance if you know the original high or width of one thing in the image (Person,Car,pencil,...) –  WiiMaxx Jul 26 '13 at 7:48

Draw a right isosceles triangle with those two vanishing points and a third point below the horizon (that is, on the same side of the horizon as the rectangle is). That third point will be our origin and the two lines to the vanishing points will be our axes. Call the distance from the origin to a vanishing point pi/2. Now extend the sides of the rectangle from the vanishing points to the axes, and mark where they intersect the axes. Pick an axis, measure the distances from the two marks to the origin, transform those distances: x->tan(x), and the difference will be the "true" length of that side. Do the same for the other axis. Take the ratio of those two lengths and you're done.

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I think I get it! Something like this: img39.imageshack.us/img39/4273/perspectivediagramisoskh.jpg I have to think about this a bit more, but at first glance I think that is exactly what I needed, thanks a lot! (by the way, I see that you simplified your answer a bit, but I found the original comments about the origin being the point below the camera, and assuming the camera to be at a distance of 1 very useful too) –  HugoRune Jul 29 '09 at 0:34
I am trying to wrap my head around this method. Is it possible to extend it for the degenerate case, when one of the vanishing points is close to infinity, i.e. when two sides of the quadrangle are parallel or almost parallel? –  HugoRune Jul 29 '09 at 2:07
Yes, that image captures it. This method is actually just approximate, and doesn't work well in some extreme cases. In the exact solution, the lines to the vanishing point aren't lines, they're curves (that's right, 2-point perspective is bunk), and the math is a little harder; I'll post some graphics if I can figure out how. If the figure is almost a rectangle, it's face-on and you can just do x->tan(x). If it's almost a parallelogram with non-right-angles, it's very small and you're sunk. –  Beta Jul 29 '09 at 13:02

You need more information, that transformed figure could come from any parallelogram given an arbitrary perspective.

So I guess you need to do some kind of calibration first.

Edit: for those who said that I was wrong, here goes the mathematical proof that there are infinite combinations of rectangles/cameras that yield to the same projection:

In order to simplify the problem (as we only need the ratio of the sides) let's assume that our rectangle is defined by the following points: `R=[(0,0),(1,0),(1,r),(0,r)]` (this simplification is the same as transforming any problem to an equivalent one in an affine space).

The transformed polygon is defined as: `T=[(tx0,ty0),(tx1,ty1),(tx2,ty2),(tx3,ty3)]`

There exists a transformation matrix `M = [[m00,m01,m02],[m10,m11,m12],[m20,m21,m22]]` that satisfies `(Rxi,Ryi,1)*M=wi(txi,tyi,1)'`

if we expand the equation above for the points,

for `R_0` we get: `m02-tx0*w0 = m12-ty0*w0 = m22-w0 = 0`

for `R_1` we get: `m00-tx1*w1 = m10-ty1*w1 = m20+m22-w1 = 0`

for `R_2` we get: `m00+r*m01-tx2*w2 = m10+r*m11-ty2*w2 = m20+r*m21+m22-w2 = 0`

and for `R_3` we get: `m00+r*m01-tx3*w3 = m10+r*m11-ty3*w3 = m20 + r*m21 + m22 -w3 = 0`

So far we have 12 equations, 14 unknown variables (9 from the matrix, 4 from the `wi`, and 1 for the ratio `r`) and the rest are known values (`txi` and `tyi` are given).

Even if the system weren't underspecified, some of the unknowns are multiplied among themselves (`r` and `mi0` products) making the system non linear (you could transform it to a linear system assigning a new name to each product, but you'll end still with 13 unknowns, and 3 of them being expanded to infinite solutions).

If you can find any flaw in the reasoning or the maths, please let me know.

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But he knows its a rectangle. i.e. scanned documents. –  Neil N Jul 28 '09 at 15:01
@Neil N So what? Maybe now the rectangles are not parallelograms and I haven't noticed... –  fortran Jul 28 '09 at 15:02
because rectangles have all 90 degree corners, which takes the possible rotations down from infinity to one (well technically two if you consider he could be looking at the back side). A huge difference. –  Neil N Jul 28 '09 at 15:04
but there's still an infinite number of different rectangles that can look the same if the correct perspective is applied. –  fortran Jul 28 '09 at 15:28
that's what I was wondering. As far as I can tell, a rectangle with (width=2*height) has a different set of possible projections than a rectangle with (width=3*height). So looking at a given perspective projection, there will be an infinite number of possible rectangles, but they will all have the same ratio of width to height. –  HugoRune Jul 28 '09 at 15:45

You can determine width / height by this answer Calculating rectangle 3D coordinate with coordinate its shadow?. Assume that your rectangle rotate on intersection diagonal point calculate it width and height. But when you change distance between the assumption shadow plane to the real shadow plane proportional of rectangle is the same with calculated width / height!

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